58995
domain: N
Appears in sequences
- Square root of n has the same nonzero digit in each of the first 4 places to the right of the decimal point.at n=21A073585
- Numbers with exactly one arithmetic progression of four successive divisors (not necessarily consecutive).at n=28A094530
- a(n) = 81*n^2 - 2*n.at n=26A157507
- Great rhombicuboctahedron with faces of centered polygons.at n=13A193252
- Number of partitions of n into distinct parts with boundary size 9.at n=42A227566
- Triangle read by rows: T(n,k) is the number of compositions of n having k distinct parts (n>=1, 1<=k<=floor((sqrt(1+8*n)-1)/2)).at n=57A235998
- Start with 443; if even, divide by 2; if odd, add next three primes: Orbit of 443 under iterations of A174221, the "PrimeLatz" map.at n=26A293978
- Numbers that are the sum of three positive cubes in four or more ways.at n=5A343968
- Numbers that are the sum of three positive cubes in exactly 4 ways.at n=5A343969
- Number of transitive relations on an n-set with exactly two ordered pairs.at n=19A349919
- Numbers k such that binomial(k^2,k) == 0 (mod k^3).at n=11A371474
- Smallest k for which a chain of linked rods of length 1, ..., k can be folded in half in exactly n dictinct ways.at n=42A390056